Brieskorn-Pham singularities via ACM bundles on Geigle-Lenzing projective spaces

Abstract

We study the singularity category of the Brieskorn-Pham singularity R=k[X1, …, X4]/(Σi=14 Xipi), associated with the Geigle-Lenzing projective space X of weight quadruple (p1,…, p4), by investigating the stable category ACM \, X of arithmetically Cohen-Macaulay bundles on X. We introduce the notion of 2-extension bundles on X, which is a higher dimensional analog of extension bundles on a weighted projective line of Geigle-Lenzing, and then establish a correspondence between 2-extension bundles and a certain important class of Cohen-Macaulay R-modules studied by Herschend-Iyama-Minamoto-Oppermann. Furthermore, we construct a tilting object in ACM \, X consisting of 2-extension bundles, whose endomorphism algebra is a 4-fold tensor product of certain Nakayama algebras. We also investigate the Picard group action on 2-extension bundles and obtain an explicit formula for the orbit number, which gives a positive answer to a higher version of an open question raised by Kussin-Lenzing-Meltzer.